17. John, Paul, George, and Ringo have all been invited to develop a garage band. Theyarrive randomly and each person arrives at a different time. What is the probability thatPaul will arrive first and Ringo will arrive last?Let:• John = J• Paul = P• George = G• Ringo = Ra. How many ways can they arrive?Show your work here:b. List all the options where Paul will arrive first and Ringo will arrive last.1"2nd3rd4thc. Find the probability that Paul will arrive first and Ringo will arrive last.Show your work here:

Answered: Image /qna-images/answer/a488869d-eeac-47d7-92c2-c5047c2b35e1.jpg

Answered: 17. John, Paul, George, and Ringo have…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Suppose you buy five boxes of cereals. In each box is apicure of a famous athlete. 20% of the cereal boxes contain Michael Phelps, 30% Lamar Jackson, and the rest Elena Delle Donne. Estimate the probability that you end up with a complete set of the pictures. Run 20 trials. Mine: randInt(1,100,5) or randInt(1,100,1) ? 1-20 = Michael Phelps 21-49 = Lamar Jackson 50-100 = Elena Delle Donne The question is asking what is the probability that I end up with a complete set of the pictures? Do I do {#,#,#,#,#} for 20 trials or {#} for 20 trials? Thanks
9500 students are enrolled in a community college. Of 9500, 3350 have a Visa, 2200 have a MasterCard, and 860 have both credit cards. Find the probability that a student selected randomly: Has only Visa Card. Has both Visa and a MasterCard. Has exactly one of the card. Has neither a Visa nor a MasterCard Draw the Venn diagram. Note! Please explain answer with each step and explaine full answer..
There are two boxes. Box A contains 6 red balls, and 4 blue balls andBox B contains 4 red balls and 8 blue balls. A die is rolled, if the number is lessthan 3, a ball is selected from box A. If the result is 3 or more, a ball is selectedfrom Box B. Calculate:a. The probability that the ball will be red and selected from Box B.b. The probability that the ball will be blue.
A prize is placed at random in one of three boxes. You pick a box (and do not open it). Now, the dealer (who knows where the prize is) chooses one of the other two boxes, opens it and shows you that it is empty. She then gives you the opportunity to keep your original box or switch to the other unopened box. Find the probability of winning the prize if you switch. Find the probability of winning the prize if you stay. Should you stay or switch?

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